Some generalizations of the variety of transposed Poisson algebras

Q3 Mathematics Communications in Mathematics Pub Date : 2023-10-10 DOI:10.46298/cm.11346

B. K. Sartayev

引用次数: 4

Abstract

It is shown that the variety of transposed Poisson algebras coincides with the variety of Gelfand-Dorfman algebras in which the Novikov multiplication is commutative. The Gr\"obner-Shirshov basis for the transposed Poisson operad is calculated up to degree 4. Furthermore, we demonstrate that every transposed Poisson algebra is F-manifold. We verify that the special identities of GD-algebras hold in transposed Poisson algebras. Finally, we propose a conjecture stating that every transposed Poisson algebra is special, i.e., can be embedded into a differential Poisson algebra.

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转置泊松代数的几种推广

证明了转置泊松代数的变化与Novikov乘法可交换的Gelfand-Dorfman代数的变化是一致的。转置泊松操作的Gr\ obner-Shirshov基计算到4次。进一步证明了每一个转置泊松代数都是f流形。证明了转置泊松代数中gd -代数的特殊恒等式成立。最后，我们提出了一个猜想，说明每一个转置泊松代数都是特殊的，即可以嵌入到微分泊松代数中。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Communications in Mathematics Mathematics-Mathematics (all)

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

45 weeks

期刊介绍： Communications in Mathematics publishes research and survey papers in all areas of pure and applied mathematics. To be acceptable for publication, the paper must be significant, original and correct. High quality review papers of interest to a wide range of scientists in mathematics and its applications are equally welcome.

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